3-02 Zermelo Fraenkel Set Theory
After familiarizing ourselves with the notation of set theory in the previous lesson, we now introduce the standard axiomatization of set theory used in modern mathematics. As we are not doing a deep-dive into axiomatic set theory, however, this discussion is more for background than anything else.
▶︎
3-03 Proofs in Set Theory
▶︎
The Axiom of Choice
▶︎
Axioms of set Theory - Lec 02 - Frederic Schuller
▶︎
Zermelo-Fraenkel Set Theory
▶︎
Set Theory Part 2: The axioms of ZFC
▶︎
The perfect number of axioms | Axiomatic Set Theory, Section 1.1
▶︎
1-01: Statements and Truth Values
▶︎
How the Axiom of Choice Gives Sizeless Sets | Infinite Series
▶︎
Group theory, abstraction, and the 196,883-dimensional monster
▶︎
Zermelo Fraenkel Introduction
▶︎
Lecture 1: Sets, Set Operations and Mathematical Induction
▶︎
Train Your Brain to Never Forget (5 Feynman Habits)
▶︎
Terence Tao: Nobody Understands Why AI Actually Works
▶︎
The Most Controversial Idea In Math
▶︎
We're 99.9% sure this pattern is true, but no one can prove it
▶︎
JANITOR vs THE BIGGEST GUYS IN THE GYM. They Didn’t Expect THAT
▶︎
The Life of Lagrange: The Genius Who Rewrote the Mathematics of the Universe
▶︎
If You Have A Bad Memory, I’ll Help You Fix It In 28 Minutes
▶︎
The unsolvable problem that launched a revolution in set theory
▶︎